Weak sharp solutions for generalized variational inequalities

Suliman Al-Homidan; Qamrul Hasan Ansari; Regina S. Burachik

doi:10.1007/s11117-016-0453-x

Weak sharp solutions for generalized variational inequalities

Suliman Al-Homidan
, Qamrul Hasan Ansari^*
, Regina S. Burachik

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

8 Scopus citations

Abstract

We consider weak sharp solutions for the generalized variational inequality problem, in which the underlying mapping is set-valued, and not necessarily monotone. We extend the concept of weak sharpness to this more general framework, and establish some of its characterizations. We establish connections between weak sharpness and (1) gap functions for variational inequalities, and (2) global error bound. When the solution set is weak sharp, we prove finite convergence of the sequence generated by an arbitrary algorithm, for the monotone set-valued case, as well as for the case in which the underlying set-valued map is either Lipschitz continuous in the set-valued sense, for infinite dimensional spaces, or inner-semicontinuous when the space is finite dimensional.

Original language	English
Pages (from-to)	1067-1088
Number of pages	22
Journal	Positivity
Volume	21
Issue number	3
DOIs	https://doi.org/10.1007/s11117-016-0453-x
State	Published - 1 Sep 2017

Bibliographical note

Publisher Copyright:
© 2016, Springer International Publishing.

Keywords

Finite convergence
Gap function
Generalized variational inequalities
Inner-semicontinuous maps
Lipschitz continuous set-valued maps
Paramonotone operators
Weak sharp solutions

ASJC Scopus subject areas

Analysis
Theoretical Computer Science
General Mathematics

Access to Document

10.1007/s11117-016-0453-x

Cite this

@article{1f9cbfb31e8b4af795143091ba667c30,

title = "Weak sharp solutions for generalized variational inequalities",

abstract = "We consider weak sharp solutions for the generalized variational inequality problem, in which the underlying mapping is set-valued, and not necessarily monotone. We extend the concept of weak sharpness to this more general framework, and establish some of its characterizations. We establish connections between weak sharpness and (1) gap functions for variational inequalities, and (2) global error bound. When the solution set is weak sharp, we prove finite convergence of the sequence generated by an arbitrary algorithm, for the monotone set-valued case, as well as for the case in which the underlying set-valued map is either Lipschitz continuous in the set-valued sense, for infinite dimensional spaces, or inner-semicontinuous when the space is finite dimensional.",

keywords = "Finite convergence, Gap function, Generalized variational inequalities, Inner-semicontinuous maps, Lipschitz continuous set-valued maps, Paramonotone operators, Weak sharp solutions",

author = "Suliman Al-Homidan and Ansari, \{Qamrul Hasan\} and Burachik, \{Regina S.\}",

note = "Publisher Copyright: {\textcopyright} 2016, Springer International Publishing.",

year = "2017",

month = sep,

day = "1",

doi = "10.1007/s11117-016-0453-x",

language = "English",

volume = "21",

pages = "1067--1088",

journal = "Positivity",

issn = "1385-1292",

publisher = "Birkhauser Verlag Basel",

number = "3",

}

TY - JOUR

T1 - Weak sharp solutions for generalized variational inequalities

AU - Al-Homidan, Suliman

AU - Ansari, Qamrul Hasan

AU - Burachik, Regina S.

PY - 2017/9/1

Y1 - 2017/9/1

N2 - We consider weak sharp solutions for the generalized variational inequality problem, in which the underlying mapping is set-valued, and not necessarily monotone. We extend the concept of weak sharpness to this more general framework, and establish some of its characterizations. We establish connections between weak sharpness and (1) gap functions for variational inequalities, and (2) global error bound. When the solution set is weak sharp, we prove finite convergence of the sequence generated by an arbitrary algorithm, for the monotone set-valued case, as well as for the case in which the underlying set-valued map is either Lipschitz continuous in the set-valued sense, for infinite dimensional spaces, or inner-semicontinuous when the space is finite dimensional.

AB - We consider weak sharp solutions for the generalized variational inequality problem, in which the underlying mapping is set-valued, and not necessarily monotone. We extend the concept of weak sharpness to this more general framework, and establish some of its characterizations. We establish connections between weak sharpness and (1) gap functions for variational inequalities, and (2) global error bound. When the solution set is weak sharp, we prove finite convergence of the sequence generated by an arbitrary algorithm, for the monotone set-valued case, as well as for the case in which the underlying set-valued map is either Lipschitz continuous in the set-valued sense, for infinite dimensional spaces, or inner-semicontinuous when the space is finite dimensional.

KW - Finite convergence

KW - Gap function

KW - Generalized variational inequalities

KW - Inner-semicontinuous maps

KW - Lipschitz continuous set-valued maps

KW - Paramonotone operators

KW - Weak sharp solutions

UR - https://www.scopus.com/pages/publications/84994462110

U2 - 10.1007/s11117-016-0453-x

DO - 10.1007/s11117-016-0453-x

M3 - Article

AN - SCOPUS:84994462110

SN - 1385-1292

VL - 21

SP - 1067

EP - 1088

JO - Positivity

JF - Positivity

IS - 3

ER -

Weak sharp solutions for generalized variational inequalities

Abstract

Bibliographical note

Keywords

ASJC Scopus subject areas

Access to Document

Fingerprint

Cite this